# All possible permutations in factor variable when ties exist in R

I have a data frame with rows sorted by values of variable `x`. If there are ties in values of `x` (like values 50 and 60 in the example below), I need all possible permutations of values in variable `group`. How can I achieve this in `R`? Is there a specialized function?

Initial data:

``````x  group
45     A
50     A
50     A
50     B
52     A
60     A
60     B
70     B
88     B
``````

Desired result:

``````x  group group2 group3 group4 group5 group6
45     A      A      A      A      A      A
50     A      A      B      A      A      B
50     A      B      A      A      B      A
50     B      A      A      B      A      A
52     A      A      A      A      A      A
60     A      A      A      B      B      B
60     B      B      B      A      A      A
70     B      B      B      B      B      B
88     B      B      B      B      B      B
``````

May be a complex answer. try this code

`````` df <- read.table(text = 'x  group
45     A
50     A
50     A
50     B
52     A
60     A
60     B
70     B

library(data.table)
library(gtools)
ss <- list()
setDT(df)[, {n = .N; ss <<- append(ss, list(data.frame(apply(gtools::permutations(n = n, r = n), 1, function(x) group[x])))); NULL}, by = 'x']
max_col <- max(sapply(ss, length))
ss[] <- lapply(ss, function(x) {
y <- x
while(length(y) < max_col)
y <- data.frame(y, x[, 1:min(length(x), max_col - length(y))])
names(y) <- paste0('group', 1:max_col)
y
})
tt <- do.call('rbind', ss)
tt\$x <- df\$x
tt
``````

final output

``````  group1 group2 group3 group4 group5 group6  x
1      A      A      A      A      A      A 45
2      A      A      A      A      B      B 50
3      A      B      A      B      A      A 50
4      B      A      B      A      A      A 50
5      A      A      A      A      A      A 52
6      A      B      A      B      A      B 60
7      B      A      B      A      B      A 60
8      B      B      B      B      B      B 70
9      B      B      B      B      B      B 88
``````

Just another (cleaner) solution. The idea is to compute all the permutations for each tie and calculate the number of copies needed for combining.

``````df <- structure(list(x = c(45L, 50L, 50L, 50L, 52L, 60L, 60L, 70L,
88L), group = structure(c(1L, 1L, 1L, 2L, 1L, 1L, 2L, 2L, 2L), .Label = c("A",
"B"), class = "factor")), .Names = c("x", "group"), class = "data.frame", row.names = c(NA,
-9L))

library(tidyverse)
library(iterpc)

ux <- unique(df\$x)
m <- length(ux)
members <- ux %>% map(~ filter(df, x == .)) %>%
map(~ getall(iterpc(table(as.character(.\$group)), ordered = TRUE)))
nrs <- members %>% map_int(nrow)
members <- members %>%
imap(~.x[rep(seq_len(nrow(.x)), prod(tail(nrs, m-.y)) , each = prod(head(nrs, .y-1))), , drop=FALSE])
data.frame(x = df\$x, t(do.call(cbind, members)))
#>    x X1 X2 X3 X4 X5 X6
#> 1 45  A  A  A  A  A  A
#> 2 50  A  A  B  A  A  B
#> 3 50  A  B  A  A  B  A
#> 4 50  B  A  A  B  A  A
#> 5 52  A  A  A  A  A  A
#> 6 60  A  A  A  B  B  B
#> 7 60  B  B  B  A  A  A
#> 8 70  B  B  B  B  B  B
#> 9 88  B  B  B  B  B  B
``````

A very tricky problem! The core of it is that you need some version of Heap's algorithm. With that in place, one can use base R to find all the levels of `x` with multiple `group` values, permute these, and then combine the permutations. As it happens, I wrote a version of this algorithm for a different project, so applying it to your data was relatively easy.

First, the algorithm:

``````permute.items <- function(x) {
l <- length(x);
if (l == 1) return(matrix(x, 1, 1));

sub.permute <- permute.items(x[-length(x)]);
arrangements <- rep(sub.permute, each=l);
arrangements <- matrix(arrangements, nrow(sub.permute) * l, ncol(sub.permute) + 1);
i <- rep(1:nrow(sub.permute), each=l);
j <- rep(1:l, l);
insert <- ifelse(i %% 2 == 1, l - j + 1, j);

for (xx in 1:nrow(arrangements)) {
arrangements[xx, insert[xx]] <- x[l];
counter <- 1;
for (yy in 1:l) {
if (yy != insert[xx]) {
arrangements[xx, yy] <- sub.permute[i[xx], counter];
counter <- counter + 1;
}
}
}
return(arrangements);
}
``````

This function takes in a vector such as `c(1, 2, 3)` or `c('a', 'b', 'c')` and returns a matrix where every row is a possible permutation of the original values. Note that the algorithm becomes very slow beyond 10-11 elements. It was also originally designed for a project where the input vector would never have duplicate elements, so we'll have to quickly cut those away.

``````# read in example data
df <- read.table(text = 'x  group
45     A
50     A
50     A
50     B
52     A
60     A
60     B
70     B
88     B', header = T, stringsAsFactors = F)

# split the data into a list.
# each element in the list corresponds to one value of 'x', and contains its values of 'group'
x.split <- split(df\$group, df\$x)

# for each value of 'x', compute unique permutations and store as a matrix
x.split <- lapply(x.split, function(x) {
y <- permute.items(x)
y <- y[!duplicated(y), ]
y <- as.matrix(y)
})

# compute total number of groups we'll need
groups <- prod(unlist(sapply(x.split, function(x) dim(x)[1])))

# pre-allocate final storage
final <- matrix(NA, nrow = nrow(df), ncol = groups)

# loop through the lists' contents and glue together group permutations
for (g in 1:groups) {
final[, g] <- unlist(lapply(x.split, function(x) x[, (g %% ncol(x)) + 1]))
}

# final formatting
final <- as.data.frame(final)
final\$x <- df\$x
``````

And the final output:

``````  V1 V2 V3 V4 V5 V6  x
1  A  A  A  A  A  A 45
2  A  B  A  A  B  A 50
3  B  A  A  B  A  A 50
4  A  A  B  A  A  B 50
5  A  A  A  A  A  A 52
6  B  A  B  A  B  A 60
7  A  B  A  B  A  B 60
8  B  B  B  B  B  B 70
9  B  B  B  B  B  B 88
``````